Efficient complex multiplication and fast fourier transform (FFT) implementation on the ManArray architecture

ABSTRACT

Efficient computation of complex multiplication results and very efficient fast Fourier transforms (FFTs) are provided. A parallel array VLIW digital signal processor is employed along with specialized complex multiplication instructions and communication operations between the processing elements which are overlapped with computation to provide very high performance operation. Successive iterations of a loop of tightly packed VLIWs are used allowing the complex multiplication pipeline hardware to be efficiently used. In addition, efficient techniques for supporting combined multiply accumulate operations are described.

This application is a divisional of U.S. application Ser. No. 10/859,708 filed Jun. 3, 2004 which is a divisional of U.S. application Ser. No. 09/337,839 filed Jun. 22, 1999, which claims the benefit of U.S. Provisional Application Ser. No. 60/103,712 filed Oct. 9, 1998, which are incorporated by reference in their entirety herein.

FIELD OF THE INVENTION

The present invention relates generally to improvements to parallel processing, and more particularly to methods and apparatus for efficiently calculating the result of a complex multiplication. Further, the present invention relates to the use of this approach in a very efficient FFT implementation on the manifold array (“ManArray”) processing architecture.

BACKGROUND OF THE INVENTION

The product of two complex numbers x and y is defined to be z=x_(R)y_(R)−x₁y₁+i(x_(R)y₁+x₁y_(R)), where x=x_(R)+ix₁, y=y_(R)+iy₁ and i is an imaginary number, or the square root of negative one, with i²=−1. This complex multiplication of x and y is calculated in a variety of contexts, and it has been recognized that it will be highly advantageous to perform this calculation faster and more efficiently.

SUMMARY OF THE INVENTION

The present invention defines hardware instructions to calculate the product of two complex numbers encoded as a pair of two fixed-point numbers of 16 bits each in two cycles with single cycle pipeline throughput efficiency. The present invention also defines extending a s series of multiply complex instructions with an accumulate operation. These special instructions are then used to calculate the FFT of a vector of numbers efficiently.

A more complete understanding of the present invention, as well as other features and advantages of the invention will be apparent from the following Detailed Description and the accompanying drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 illustrates an exemplary 2×2 ManArray iVLIW processor;

FIG. 2A illustrates a presently preferred multiply complex instruction, MPYCX;

FIG. 2B illustrates the syntax and operation of the MPYCX instruction of FIG. 2A;

FIG. 3A illustrates a presently preferred multiply complex divide by 2 instruction, MPYCXD2;

FIG. 3B illustrates the syntax and operation of the MPYCXD2 instruction of FIG. 3A;

FIG. 4A illustrates a presently preferred multiply complex conjugate instruction, MPYCXJ;

FIG. 4B illustrates the syntax and operation of the MPYCXJ instruction of FIG. 4A;

FIG. 5A illustrates a presently preferred multiply complex conjugate divide by two instruction, MPYCXJD2;

FIG. 5B illustrates the syntax and operation of the MPYCXJD2 instruction of FIG. 5A;

FIG. 6 illustrates hardware aspects of a pipelined multiply complex and its divide by two instruction variant;

FIG. 7 illustrates hardware aspects of a pipelined multiply complex conjugate, and its divide by two instruction variant;

FIG. 8 shows an FFT signal flow graph;

FIG. 9A-9H illustrate aspects of the implementation of a distributed FFT algorithm on a 2×2 ManArray processor using a VLIW algorithm with MPYCX instructions in a cycle-by-cycle sequence with each step corresponding to operations in the FFT signal flow graph;

FIG. 9I illustrates how multiple iterations may be tightly packed in accordance with the present invention for a distributed FFT of length four;

FIG. 9J illustrates how multiple iterations may be tightly packed in accordance with the present invention for a distributed FFT of length two;

FIGS. 10A and 10B illustrate Kronecker Product examples for use in reference to the mathematical presentation of the presently preferred distributed FFT algorithm;

FIG. 11A illustrates a presently preferred multiply accumulate instruction, MPYA;

FIG. 11B illustrates the syntax and operation of the MPYA instruction of FIG. 11A;

FIG. 12A illustrates a presently preferred sum of 2 products accumulate instruction, SUM2PA;

FIG. 12B illustrates the syntax and operation of the SUM2PA instruction of FIG. 12A;

FIG. 13A illustrates a presently preferred multiply complex accumulate instruction, MPYCXA;

FIG. 13B illustrates the syntax and operation of the MPYCXA instruction of FIG. 13A;

FIG. 14A illustrates a presently preferred multiply complex accumulate divide by two instruction, MPYCXAD2;

FIG. 14B illustrates the syntax and operation of the MPYCXAD2 instruction of FIG. 14A;

FIG. 15A illustrates a presently preferred multiply complex conjugate accumulate s instruction, MPYCXJA;

FIG. 15B illustrates the syntax and operation of the MPYCXJA instruction of FIG. 15A;

FIG. 16A illustrates a presently preferred multiply complex conjugate accumulate divide by two instruction, MPYCXJAD2;

FIG. 16B illustrates the syntax and operation of the MPYCXJAD2 instruction of FIG. in 16A;

FIG. 17 illustrates hardware aspects of a pipelined multiply complex accumulate and its divide by two variant; and

FIG. 18 illustrates hardware aspects of a pipelined multiply complex conjugate accumulate and its divide by two variant.

DETAILED DESCRIPTION

Further details of a presently preferred ManArray architecture for use in conjunction with the present invention are found in U.S. Pat. Nos. 6,023,753, 6,167,502, 6,343,356, 6,167,501 filed Oct. 9, 1998, U.S. Pat. Nos. 6,219,776, 6,151,668, 6,173,389, 6,101,592, 6,216,223, 6,366,999, 6,446,190, as well as, U.S. Pat. Nos. 6,356,994, 6,839,728, 6,697,427, 6,256,683, and 6,260,082 and incorporated by reference herein in their entirety.

In a presently preferred embodiment of the present invention, a ManArray 2×2 iVLIW single instruction multiple data stream (SIMD) processor 100 shown in FIG. 1 contains a controller sequence processor (SP) combined with processing element-0 (PE0) SP/PE0 101, as described in further detail in U.S. Pat. No. 6,219,776. Three additional PEs 151, 153, and 155 are also utilized to demonstrate the implementation of efficient complex multiplication and fast fourier transform (FFT) computations on the ManArray architecture in accordance with the present invention. It is noted that the PEs can be also labeled with their matrix positions as shown in parentheses for PE0 (PE00) 101, PEI (PE01) 151, PE2 (PE10) 153, and PE3 (PE11) 155.

The SP/PE0 101 contains a fetch controller 103 to allow the fetching of short instruction words (SIWs) from a 32-bit instruction memory 105. The fetch controller 103 provides the typical functions needed in a programmable processor such as a program counter (PC), branch capability, digital signal processing, EP loop operations, support for interrupts, and also provides the instruction memory management control which could include an instruction cache if needed by an application. In addition, the SIW I-Fetch controller 103 dispatches 32-bit SIWs to the other PEs in the system by means of a 32-bit instruction bus 102.

In this exemplary system, common elements are used throughout to simplify the explanation, though actual implementations are not so limited. For example, the execution units 131 in the combined SP/PE0 101 can be separated into a set of execution units optimized for the control function, e.g. fixed point execution units, and the PE0 as well as the other PEs 151, 153 and 155 can be optimized for a floating point application. For the purposes of this description, it is assumed that the execution units 131 are of the same type in the SP/PE0 and the other PEs. In a similar manner, SP/PE0 and the other PEs use a five instruction slot iVLIW architecture which contains a very long instruction word memory (VIM) memory 109 and an instruction decode and VIM controller function unit 107 which receives instructions as dispatched from the SP/PE0's I-Fetch unit 103 and generates the VIM addresses-and-control signals 108 required to access the iVLIWs stored in the VIM. These iVLIWs are identified by the letters SLAMD in VIM 109. The loading of the iVLIWs is described in further detail in U.S. Pat. No. 6,151,668. Also contained in the SP/PE0 and the other PEs is a common PE configurable register file 127 which is described in further detail in U.S. Pat. No. 6,343,356.

Due to the combined nature of the SP/PE0, the data memory interface controller 125 must handle the data processing needs of both the SP controller, with SP data in memory 121, and PE0, with PE0 data in memory 123. The SP/PE0 controller 125 also is the source of the data that is sent over the 32-bit broadcast data bus 126. The other PEs 151, 153, and 155 contain common physical data memory units 123′, 123″, and 123′″ though the data stored in them is generally different as required by the local processing done on each PE. The interface to these PE data memories is also a common design in PEs 1, 2, and 3 and indicated by PE local memory and data bus interface logic 157, 157′ and 157″. Interconnecting the PEs for data transfer communications is the cluster switch 171 more completely described in U.S. Pat. Nos. 6,023,753, 6,167,502, and 6,167,501. The interface to a host processor, other peripheral devices, and/or external memory can be done in many ways. The primary mechanism shown for completeness is contained in a direct memory access (DMA) control unit 181 that provides a scalable ManArray data bus 183 that connects to devices and interface units external to the ManArray core. The DMA control unit 181 provides the data flow and bus arbitration mechanisms needed for these external devices to interface to the ManArray core memories via the multiplexed bus interface represented by line 185. A high level view of a ManArray Control Bus (MCB) 191 is also shown.

All of the above noted patents are assigned to the assignee of the present invention and incorporated herein by reference in their entirety.

Special Instructions for Complex Multiply

Turning now to specific details of the ManArray processor as adapted by the present invention, the present invention defines the following special hardware instructions that execute in each multiply accumulate unit (MAU), one of the execution units 131 of FIG. 1 and in each PE, to handle the multiplication of complex numbers:

-   -   MPYCX instruction 200 (FIG. 2A), for multiplication of complex         numbers, where the complex product of two source operands is         rounded according to the rounding mode specified in the         instruction and loaded into the target register. The complex         numbers are organized in the source register such that halfword         H1 contains the real component and halfword H0 contains the         imaginary component. The MPYCX instruction format is shown in         FIG. 2A. The syntax and operation description 210 is shown in         FIG. 2B.     -   MPYCXD2 instruction 300 (FIG. 3A), for multiplication of complex         numbers, with the results divided by 2, FIG. 3, where the         complex product of two source operands is divided by two,         rounded according to the rounding mode specified in the         instruction, and loaded into the target register. The complex         numbers are organized in the source register such that halfword         H1 contains the real component and halfword H0 contains the         imaginary component. The MPYCXD2 instruction format is shown in         FIG. 3A. The syntax and operation description 310 is shown in         FIG. 3B.     -   MPYCXJ instruction 400 (FIG. 4A), for multiplication of complex         numbers where the second argument is conjugated, where the         complex product of the first source operand times the conjugate         of the second source operand, is rounded according to the         rounding mode specified in the instruction and loaded into the         target register. The complex numbers are organized in the source         register such that halfword H1 contains the real component and         halfword H0 contains the imaginary component. The MPYCXJ         instruction format is shown in FIG. 4A. The syntax and operation         description 410 is shown in FIG. 4B.     -   MPYCXJD2 instruction 500 (FIG. 5A), for multiplication of         complex numbers where the second argument is conjugated, with         the results divided by 2, where the complex product of the first         source operand times the conjugate of the second operand, is         divided by two, to rounded according to the rounding mode         specified in the instruction and loaded into the target         register. The complex numbers are organized in the source         register such that halfword H1 contains the real component and         halfword H0 contains the imaginary component. The MPYCXJD2         instruction format is shown in FIG. 5A. The syntax and operation         description 510 is shown in FIG. 5B.

All of the above instructions 200, 300, 400 and 500 complete in 2 cycles and are pipeline-able. That is, another operation can start executing on the execution unit after the first cycle. All complex multiplication instructions return a word containing the real and imaginary part of the complex product in half words H1 and H0 respectively.

To preserve maximum accuracy, and provide flexibility to programmers, four possible rounding modes are defined:

-   -   Round toward the nearest integer (referred to as ROUND)     -   Round toward 0 (truncate or fix, referred to as TRUNC)     -   Round toward infinity (round up or ceiling, the smallest integer         greater than or equal to the argument, referred to as CEIL)     -   Round toward negative infinity (round down or floor, the largest         integer smaller than or equal to the argument, referred to as         FLOOR).

Hardware suitable for implementing the multiply complex instructions is shown in FIG. 6 and FIG. 7. These figures illustrate a high level view of the hardware apparatus 600 and 700 appropriate for implementing the functions of these instructions. This hardware capability may be advantageously embedded in the ManArray multiply accumulate unit (MAU), one of the execution units 131 of FIG. 1 and in each PE, along with other hardware capability supporting other MAU instructions. As a pipelined operation, the first execute cycle begins with a read of the source register operands from the compute register file (CRF) shown as registers 603 and 605 in FIG. 6 and as registers 111, 127, 127′, 127″, and 127′″ in FIG. 1. These register values are input to the MAU logic after some operand access delay in halfword data paths as indicated to the appropriate multiplication units 607, 609, 611, and 613 of FIG. 6. The outputs of the multiplication operation units, X_(R)*Y_(R) 607, X_(R)*Y₁ 609, X₁*Y_(R) 611, and X₁*Y₁ 613, are stored in pipeline registers 615, 617, 619, and 621, respectively. The second execute cycle, which can occur while a new multiply complex instruction is using the first cycle execute facilities, begins with using the stored pipeline register values, in pipeline register 615, 617, 619, and 621, and appropriately adding in adder 625 and subtracting in subtractor 623 as shown in FIG. 6. The add function and subtract function are selectively controlled functions allowing either addition or subtraction operations as specified by the instruction. The values generated by the apparatus 600 shown in FIG. 6 contain a maximum precision of calculation which exceeds 16-bits. Consequently, the appropriate bits must be selected and rounded as indicated in the instruction before storing the final results. The selection of the bits and rounding occurs in selection and rounder circuit 627. The two 16-bit rounded results are then stored in the appropriate halfword position of the target register 629 which is located in the compute register file (CRF). The divide by two variant of the multiply complex instruction 300 selects a different set of bits as specified in the instruction through block 627. The hardware 627 shifts each data value right by an additional 1-bit and loads two divided-by-2 rounded and shifted values into each half word position in the target registers 629 in the CRF.

The hardware 700 for the multiply complex conjugate instruction 400 is shown in FIG. 7. The main difference between multiply complex and multiply complex conjugate is in adder 723 and subtractor 725 which swap the addition and subtraction operation as compared with FIG. 6. The results from adder 723 and subtractor 725 still need to be selected and rounded in selection and rounder circuit 727 and the final rounded results stored in the target register 729 in the CRF. The divide by two variant of the multiply complex conjugate instruction 500 selects a different set of bits as specified in the instruction through selection and rounder circuit 727. The hardware of circuit 727 shifts each data value right by an additional 1-bit and loads two divided-by-2 rounded and shifted values into each half word position in the target registers 729 in the CRF.

The FFT Algorithm

The power of indirect VLIW parallelism using the complex multiplication instructions is demonstrated with the following fast Fourier transform (FFT) example. The algorithm of this example is based upon the sparse factorization of a discrete Fourier transform (DFT) matrix. Kronecker-product mathematics is used to demonstrate how a scalable algorithm is created.

The Kronecker product provides a means to express parallelism using mathematical notation. It is known that there is a direct mapping between different tensor product forms and some important architectural features of processors. For example, tensor matrices can be created in parallel form and in vector form. J. Granata, M. Conner, R. Tolimieri, The Tensor Product: A Mathematical Programming Language for FFTs and other Fast DSP Operations, IEEE SP Magazine, January 1992, pp. 40-48. The Kronecker product of two matrices is a block matrix with blocks that are copies of the second argument multiplied by the corresponding element of the first argument. Details of an exemplary calculation of matrix vector products y=(Im{circle around (x)}A)x are shown in FIG. 10A. The matrix is block diagonal with m copies of A. If vector x was distributed block-wise in m processors, the operation can be done in parallel without any communication between the processors. On the other hand, the following calculation, shown in detail in FIG. 10B, y=(A{circle around (x)}Im)i x requires that x be distributed physically on mn processors for vector parallel computation.

The two Kronecker products are related via the identity I{circle around (x)}A=P(A{circle around (x)}I)P ^(T) where P is a special permutation matrix called stride permutation and P is the transpose permutation matrix. The stride permutation defines the required data distribution for a parallel operation, or the communication pattern needed to transform block distribution to cyclic and vice-versa.

The mathematical description of parallelism and data distributions makes it possible to conceptualize parallel programs, and to manipulate them using linear algebra identities and thus better map them onto target parallel architectures. In addition, Kronecker product notation arises in many different areas of science and engineering. The Kronecker product simplifies the expression of many fast algorithms. For example, different FFT algorithms correspond to different sparse matrix factorizations of the Discrete Fourier Transform (DFT), whose factors involve Kronecker products. Charles F. Van Loan, Computational Frameworks for the Fast Fourier Transform, SIAM, 1992, pp 78-80.

The following equation shows a Kronecker product expression of the FFT algorithm, based on the Kronecker product factorization of the DFT matrix, F _(n)=(F _(p) {circle around (x)}I _(m))D _(p,m)(I _(p) {circle around (x)}F _(m))P _(n,p) where:

n is the length of the transform

p is the number of PEs

m=n/p

The equation is operated on from right to left with the P_(n,p) permutation operation occurring first. The permutation directly maps to a direct memory access (DMA) operation that specifies how the data is to be loaded in the PEs based upon the number of PEs p and length of the transform n. F _(n)=(F _(p) {circle around (x)}I _(M))D _(p,m)(I _(p) {circle around (x)}F _(m))P _(n,p) where P_(n,p) corresponds to DMA loading data with stride p to local PE memories.

In the next stage of operation all the PEs execute a local FFT of length m=n/p with local data. No communications between PEs is required. F _(n)=(F _(p) {circle around (x)}I _(m))D _(p,)(I _(p) {circle around (x)}F _(m))P _(n,) where (I_(p){circle around (x)}F_(m))specifies that all PEs execute a local FFT of length m sequentially, with local data.

In the next stage, all the PEs scale their local data by the twiddle factors and collectively execute m distributed FFTs of length p. This stage requires inter-PE communications. F _(n)=(F _(p) {circle around (x)}I _(m))D _(p,m)(I _(p) {circle around (x)}F _(m))P _(n,p) where (F_(p){circle around (x)}I_(m))D_(p,m) specifies that all PEs scale their local data by the twiddle factors and collectively execute multiple FFTs of length p on distributed data. In this final stage of the FFT computation, a relatively large number m of small distributed FFTs of size p must be calculated efficiently. The challenge is to completely overlap the necessary communications with the relatively simple computational requirements of the FFT.

The sequence of illustrations of FIGS. 9A-9H outlines the ManArray distributed FFT algorithm using the indirect VLIW architecture, the multiply complex instructions, and operating on the 2×2 ManArray processor 100 of FIG. 1. The signal flow graph for the small FFT is shown in FIG. 8 and also shown in the right-hand-side of FIGS. 9A-9H. In FIG. 8, the operation for a 4 point FFT is shown where each PE executes the operations shown on a horizontal row. The operations occur in parallel on each vertical time slice of operations as shown in the signal flow graph figures in FIGS. 9A-9H. The VLIW code is displayed in a tabular form in FIGS. 9A-9H that corresponds to the structure of the ManArray architecture and the iVLIW instruction. The columns of the table correspond to the execution units available in the ManArray PE: Load Unit, Arithmetic Logic Unit (ALU), Multiply Accumulate Unit (MAU), Data Select Unit (DSU) and the Store Unit. The rows of the table can be interpreted as time steps representing the execution of different iVLIW lines.

The technique shown is a software pipeline implemented approach with iVLIWs. In FIGS. 9A-9I, the tables show the basic pipeline for PE3 155. FIG. 9A represents the input of the data X and its corresponding twiddle factor W by loading them from the PEs local memories, using the load indirect (Lii) instruction. FIG. 9B illustrates the complex arguments X and W which are multiplied using the MPYCX instruction 200, and FIG. 9C illustrates the communications operation between PEs, using a processing element exchange (PEXCHG) instruction. Further details of this instruction are found in U.S. Pat. No. 6,167,501. FIG. 9D illustrates the local and received quantities are added or subtracted (depending upon the processing element, where for PE3 a subtract (sub) instruction is used). FIG. 9E illlustrates the result being multiplied by -i on PE3, using the MPYCX instruction. FIG. 9F illustrates another PE-to-PE communications operation where the previous product is exchanged between the PEs, using the PEXCHG instruction. FIG. 9G illustrates the local and received quantities are added or subtracted (depending upon the processing element, where for PE3 a subtract (sub) instruction is used). FIG. 9H illustrates the step where the results are stored to local memory, using a store indirect (sii) instruction.

The code for PEs 0, 1, and 2 is very similar, the two subtractions in the arithmetic logic unit in steps 9D and 9G are substituted by additions or subtractions in the other PEs as required by the algorithm displayed in the signal flow graphs. To achieve that capability and the distinct MPYCX operation in FIG. 9E shown in these figures, synchronous MIMD capability is required as described in greater detail in U.S. Patent No. 6,151,668 and incorporated by reference herein in its entirety. By appropriate packing, a very tight software pipeline can be achieved as shown in FIG. 9I for this FFT example using only two VLIWs.

In the steady state, as can be seen in FIG. 9I, the Load, ALU, MAU, and DSU units are fully utilized in the two VLIWs while the store unit is used half of the time. This high utilization rate using two VLIWs leads to very high performance. For example, a 256-point complex FFT can be accomplished in 425 cycles on a 2×2 ManArray.

As can be seen in the above example, this implementation accomplishes the following:

-   -   An FFT butterfly of length 4 can be calculated and stored every         two cycles, using four PEs.     -   The communication requirement of the FFT is completely         overlapped by the computational requirements of this algorithm.     -   The communication is along the hypercube connections that are         available as a subset of the connections available in the         ManArray interconnection network.     -   The steady state of this algorithm consists of only two VLIW         lines (the source code is two VLIW lines long).     -   All execution units except the Store unit are utilized all the         time, which lead us to conclude that this implementation is         optimal for this architecture.         Problem Size Discussion

The equation: F _(n)=(F _(p) {circle around (x)}I _(m))D _(p,m)(I _(p) {circle around (x)}F _(m))P _(n,p) where:

n is the length of the transform,

p is the number of PEs, and

m=n/p

is parameterized by the length of the transform n and the number of PEs, where m=n/p relates to the size of local memory needed by the PEs. For a given power-of-2 number of processing elements and a sufficient amount of available local PE memory, distributed FFTs of size p can be calculated on a ManArray processor since only hypercube connections are required. The hypercube of p or fewer nodes is a proper subset of the ManArray network. When p is a multiple of the number of processing elements, each PE emulates the operation of more than one virtual node. Therefore, any size of FFT problem can be handled using the above equation on any size of ManArray processor.

For direct execution, in other words, no emulation of virtual PEs, on a ManArray of size p, we need to provide a distributed FFT algorithm of equal size. For p=1, it is the sequential FFT. For p=2, the FFT of length 2 is the butterfly: Y0=x0+w*X1, and Y1=x0−w*X1 where X0 and Y0 reside in or must be saved in the local memory of PE0 and X1 and Y1 on PE1, respectively. The VLIWs in PE0 and PE1 in a 1×2 ManArray processor (p=2) that are required for the calculation of multiple FFTs of length 2 are shown in FIG. 9I which shows that two FFT results are produced every two cycles using four VLIWs. Extending Complex Multiplication

It is noted that in the two-cycle complex multiplication hardware described in FIGS. 6 and 7, the addition and subtraction blocks 623, 625, 723, and 725 operate in the second execution cycle. By including the MPYCX, MPYCXD2, MPYCXJ, and MPYCXJD2 instructions in the ManArray MAU, one of the execution units 131 of FIG. 1, the complex multiplication operations can be extended. The ManArray MAU also supports multiply accumulate operations (MACs) as shown in FIGS. 11A and 12A for use in general digital signal processing (DSP) applications. A s multiply accumulate instruction (MPYA) 1100 as shown in FIG. 11A, and a sum two product accumulate instruction (SUM2PA) 1200 as shown in FIG. 12A, are defined as follows.

In the MPYA instruction 1100 of FIG. 11A, the product of source registers Rx and Ry is added to target register Rt. The word multiply form of this instruction multiplies two 32-bit values producing a 64-bit result which is added to a 64-bit odd/even target register. The dual halfword form of MPYA instruction 1100 multiplies two pairs of 16-bit values producing two 32-bit results: one is added to the odd 32-bit word, the other is added to the even 32-bit word of the odd/even target register pair. Syntax and operation details 1110 are shown in FIG. 11B. In the SUM2PA instruction 1200 of FIG. 12A, the product of the high halfwords of source registers Rx and Ry is added to the product of the low halfwords of Rx and Ry and the result is added to target register Rt and then stored in Rt. Syntax and operation details 1210 are shown in FIG. 12B.

Both MPYA and SUMP2A generate the accumulate result in the second cycle of the two-cycle pipeline operation. By merging MPYCX, MPYCXD2, MPYCXJ, and MPYCXJD2 instructions with MPYA and SUMP2A instructions, the hardware supports the extension of the complex multiply operations with an accumulate operation. The mathematical operation is defined as: Z_(T)=Z_(R)+X_(R)Y_(R)−X₁Y₁+i(Z₁+X_(R)Y₁+X₁Y_(R)), where X=X_(R)+iX₁, Y=Y_(R)+iY₁ and i is an imaginary number, or the square root of negative one, with i²−1. This complex multiply accumulate is calculated in a variety of contexts, and it has been recognized that it will be highly advantageous to perform this calculation faster and more efficiently.

For this purpose, an MPYCXA instruction 1300 (FIG. 13A), an MPYCXAD2 instruction 1400 (FIG. 14A), an MPYCXJA instruction 1500 (FIG. 15A), and an MPYCXJAD2 instruction 1600 (FIG. 16A) define the special hardware instructions that handle the multiplication with accumulate for complex numbers. The MPYCXA instruction 1300, for multiplication of complex numbers with accumulate is shown in FIG. 13. Utilizing this instruction, the accumulated complex product of two source operands is rounded according to the rounding mode specified in the instruction and loaded into the target register. The complex numbers are organized in the source register such that halfword H1 contains the real component and halfword H0 contains the imaginary component. The MPYCXA instruction format is shown in FIG. 13A. The syntax and operation description 1310 is shown in FIG. 13B.

The MPYCXAD2 instruction 1400, for multiplication of complex numbers with accumulate, with the results divided by two is shown in FIG. 14A. Utilizing this instruction, the accumulated complex product of two source operands is divided by two, rounded according to the rounding mode specified in the instruction, and loaded into the target register. The complex numbers are organized in the source register such that halfword H1 contains the real component and halfword H0 contains the imaginary component. The MPYCXAD2 instruction format is shown in FIG. 14A. The syntax and operation description 1410 is shown in FIG. 14B.

The MPYCXJA instruction 1500, for multiplication of complex numbers with accumulate where the second argument is conjugated is shown in FIG. 15A. Utilizing this instruction, the accumulated complex product of the first source operand times the conjugate of the second source operand, is rounded according to the rounding mode specified in the instruction and loaded into the target register. The complex numbers are organized in the source register such that halfword H1 contains the real component and halfword H0 contains the imaginary component. The MPYCXJA instruction format is shown in FIG. 15A. The syntax and operation description 1510 is shown in FIG. 15B.

The MPYCXJAD2 instruction 1600, for multiplication of complex numbers with accumulate where the second argument is conjugated, with the results divided by two is shown in FIG. 16A. Utilizing this instruction, the accumulated complex product of the first source operand times the conjugate of the second operand, is divided by two, rounded according to the rounding mode specified in the instruction and loaded into the target register. The complex numbers are organized in the source register such that halfword H1 contains the real component and halfword H0 contains the imaginary component, The MPYCXJAD2 instruction format is shown in FIG. 16A. The syntax and operation description 1610 is shown in FIG. 16B.

All instructions of the above instructions 1100, 1200, 1300, 1400, 1500 and 1600 complete in two cycles and are pipeline-able. That is, another operation can start executing on the execution unit after the first cycle. All complex multiplication instructions 1300, 1400, 1500 and 1600 return a word containing the real and imaginary part of the complex product in half words H1 and H0 respectively.

To preserve maximum accuracy, and provide flexibility to programmers, the same four rounding modes specified previously for MPYCX, MPYCXD2, MPYCXJ, and MPYCXJD2 are used in the extended complex multiplication with accumulate.

Hardware 1700 and 1800 for implementing the multiply complex with accumulate instructions is shown in FIG. 17 and FIG. 18, respectively. These figures illustrate the high level view of the hardware 1700 and 1800 appropriate for these instructions. The important changes to note between FIG. 17 and FIG. 6 and between FIG. 18 and FIG. 7 are in the second stage of the pipeline where the two-input adder blocks 623, 625, 723, and 725 are replaced with three-input adder blocks 1723, 1725, 1823, and 1825. Further, two new half word source operands are used as inputs to the operation, The Rt.H1 1731 (1831) and Rt.H0 1733 (1833) values are properly aligned and selected by multiplexers 1735 (1835) and 1737 (1837) as inputs to the new adders 1723 (1823) and 1725 (1825). For the appropriate alignment, Rt.H1 is shifted right by 1-bit and Rt.H0 is shifted left by 15-bits. The add/subtract, add/sub blocks 1723 (1823) and 1725 (1825), operate on the input data and generate the outputs as shown. The add function and subtract function are selectively controlled functions allowing either addition or subtraction operations as specified by the instruction. The results are rounded and bits 30-15 of both 32-bit results are selected 1727 (1827) and stored in the appropriate half word of the target register 1729 (1829) in the CRF. It is noted that the multiplexers 1735 (1835) and 1737 (1837) select the zero input, indicated by the ground symbol, for the non-accumulate versions of the complex multiplication series of instructions.

While the present invention has been disclosed in the context of various aspects of presently preferred embodiments, it will be recognized that the invention may be suitably applied to other environments consistent with the claims which follow. 

1. An apparatus operable to process a Fast Fourier Transform (FFT) on an array processor, the apparatus comprising: a plurality of processing elements (PEs), each PE comprising a data memory, a very long instruction word (VLIW) memory, a multiply complex execution unit, an instruction port, and a data port, wherein said data memory is operable to store a subset of input data, wherein said VLIW memory is operable to store multiply complex instructions in one or more VLIWs, wherein said multiply complex execution unit is operable to multiply two complex number input operands both of a first data format to form a complex number result of the first data format in response to each of the multiply complex instructions; an interconnection network coupled to the data port of each PE operable to communicate data between PEs selected from the plurality of PEs; and a control processor operable to fetch a sequence of instructions, wherein said control processor is further operable to distribute the sequence of instructions to the instruction port of each of the PEs to calculate an FFT on the input data, wherein each PE is operable to fetch a sequence of the one or more VLIWs from the VLIW memory based on said sequence of instructions, wherein the multiply complex execution unit on each PE is operable to calculate a local FFT on the subset of input data in response to the sequence of the one or more VLIWs and to calculate distributed FFTs on the results of the local FFTs using the interconnection network to communicate data between the selected PEs.
 2. The apparatus of claim 1 wherein the subset of input data is accessed from the input data at stride P by a direct memory access (DMA) operation and loaded to the corresponding data memory associated with each PE.
 3. The apparatus of claim 1 wherein the sequence of instructions contains a sequence of execute VLIW instructions, each of the execute VLIW instructions when executed in a PE generates a VLIW memory address to fetch a VLIW from the VLIW memory in each PE for execution, the VLIW fetched in each PE specified according to the function that PE is to perform.
 4. The apparatus of claim 1 wherein the two complex number input operands both comprise a real operand and an imaginary operand each of a first data format, the complex number result comprises a real result and an imaginary result each of the same data format as the first data format, and the complex number result is used as a complex number input operand for a subsequent multiply complex instruction.
 5. The apparatus of claim 1 wherein the multiply complex execution unit comprises: four multiplication units to generate terms of a complex multiplication of the two complex number input operands as multiplication results; four pipeline registers to hold the multiplication results; an add function responsive to the multiply complex instruction which adds two of the multiplication results from the pipeline registers to produce an imaginary component of a complex result; a subtract function responsive to the multiply complex instruction which subtracts two of the multiplication results from the pipeline registers to produce a real component of the complex result; and a round and select unit to format the real and imaginary components of the complex results as the complex number result.
 6. The apparatus of claim 1 wherein the multiply complex execution unit comprises: four multiplication units to generate terms of a complex multiplication of the two complex number input operands as multiplication results; four pipeline registers to hold the multiplication results; an add function responsive to the multiply complex conjugate instruction which adds two of the multiplication results from the pipeline registers to produce a real component of a complex result; a subtract function responsive to the multiply complex conjugate instruction which subtracts two of the multiplication results from the pipeline registers to produce an imaginary component of the complex result; and a round and select unit to format the real and imaginary components of the complex results as the complex number result.
 7. The apparatus of claim 1 wherein the sequence of instructions comprises: a first sequence of instructions that is fetched and distributed to the instruction port of each of the PEs, the first sequence of instructions selects a first sequence of VLIWs from the VLIW memory in each PE causing the execution of a first set of multiply complex instructions on each PE to calculate the local FFT, wherein P is the number of PEs and T is the size of the FFT to be calculated and the local FFT being of size T/P whereby P local FFTs each of size T/P are calculated; and a second sequence of instructions that is fetched and distributed to the instruction port of each of the PEs, whereby the second sequence of instructions selects a second sequence of VLIWs from the VLIW memory in each PE causing the execution of a second set of multiply complex instructions and in parallel causing data to be communicated between pairs of PEs along hypercube data paths provided by the interconnection network, whereby T/P distributed FFTs each of size P are calculated on the results of the P local FFTs.
 8. The apparatus of claim 7 wherein the first sequence of instructions is governed by the mathematical operation (I_(p) {circle around (x)}F_(T/P)) for execution on the array processor, wherein (F_(T/P)) is an FFT of length T/P calculated on each PE, (I_(P)) is a P×P identity matrix, and {circle around (x)} is a symbol for a Kronecker product of two matrices.
 9. The apparatus of claim 7 wherein the second sequence of instructions scales the results of the P local FFTs by corresponding twiddle factors.
 10. The apparatus of claim 7 wherein the second sequence of instructions is governed by the mathematical operation (F_(P) {circle around (x)}I_(T/P))D_(P.T/P) for distributed execution on the array processor, wherein D_(P.T/P) is a matrix of twiddle factors for scaling local data on each PE, (I_(T/P)) is a (T/P)×(T/P) identity matrix, (F_(P)) is an FFT of length P, and {circle around (x)} is a symbol for a Kronecker product of two matrices.
 11. The apparatus of claim 1, wherein P is the number of PEs and T is the size of the FFT to be calculated, and wherein P local FFTs of size T/P are calculated and T/P distributed FFTs of size P are calculated on the results of the P local FFTs using data communicated between the selected PEs along hypercube data paths provided by the interconnection network, whereby the FFT of size T is calculated on the input data.
 12. The apparatus of claim 11 wherein the hypercube data paths are a subset of the connections available in the interconnection network.
 13. A method for the efficient processing of a Fast Fourier Transform (FFT) of size T on an array processor of P processing elements (PEs) that are coupled by hypercube datapaths, the method comprising: loading a set of instructions to form one or more very long instruction words (VLIWs) in a VLIW memory in each PE to be fetched for execution in a software pipeline; executing the one or more VLIWs in the software pipeline, the software pipeline in each PE comprising: loading from a local PE data memory complex input data and twiddle factor values formatted with a first format; and calculating the mathematical operation (F_(P) {circle around (x)}I_(T/P))D_(P.T/P), wherein D_(P.T/P) is a matrix of twiddle factors for scaling local data on each PE, (I_(T/P)) is a (T/P)×(T/P) identity matrix, (F_(P)) is an FFT of length P, and {circle around (x)} is a symbol for a Kronecker product of two matrices, wherein the mathematical operation includes use of multiply complex instructions and PE exchange instructions for communicating between hypercube neighbor PEs along the hypercube datapaths, the multiply complex instructions and the PE exchange instructions selected for execution in parallel from the one or more VLIWs.
 14. The method of claim 13 wherein a first stage of the mathematical operation (F_(P) {circle around (x)}I_(T/P))D_(P.T/P) in each PE comprises: multiplying the complex input data and twiddle factors in a complex multiplication execution unit to produce a first complex result formatted with the first format; and communicating the first complex result between hypercube neighbor PEs.
 15. The method of claim 14 wherein a second stage of the mathematical operation (F_(P) {circle around (x)}I_(T/P))D_(P.T/P) in each PE comprises: adding or subtracting the communicated first complex result according to a PE's position in the array of PEs to produce a second complex result with the first format; multiplying the second complex result by a complex value according to the PE's position in the array of PEs to produce a third complex result with the first format; communicating between hypercube neighbor PEs the second complex result or the third complex result according to the PE's position in the array of PEs; and adding or subtracting the communicated second complex result or communicated third complex result according to the PE's position in the array of PEs to produce a fourth complex result of the first format.
 16. The method of claim 13 further comprising: selectively enabling instructions stored in the one or more VLIWs in a local PE VLIW memory in each PE to establish a prolog sequence of instructions that sets up data for processing the step of executing the one or more VLIWs in a software pipeline in a loop according to the size of the FFT to be processed.
 17. An apparatus for the efficient processing of an FFT on an array processor comprising: a plurality of P processing elements (PEs), each PE having a multiply complex execution unit configured for executing multiply complex instructions and generating a complex number result for each execution of a multiply complex instruction, the complex number result used directly as a complex numbers input for a subsequent instruction; a plurality of P data memories, each data memory coupled with a corresponding PE and storing a subset of input data associated with each PE; an interconnection network coupling each of the PEs configured for communicating data between pairs of PEs in parallel along hypercube couplings; a very long instruction word (VLIW) memory associated with each PE configured for storing VLIWs having one or more multiply complex instructions for individual selection and execution to process the input data according to an FFT program; and a controller sequence processor (SP) coupled to each of the PEs by an instruction bus for distributing PE instructions to the PEs according to the FFT program, wherein a local FFT is calculated on each PE and distributed FFTs are calculated on the array processor to efficiently calculate an FFT.
 18. The apparatus of claim 17 further comprising: an instruction memory storing the FFT program including PE instructions, the PE instructions fetched by the SP and distributed to the plurality of P PEs.
 19. The apparatus of claim 17 wherein each PE further comprises a VLIW memory controller for controlling the VLIW memory and responsive to an execute VLIW instruction which when executed in a PE generates a VLIW memory address, which is the same VLIW memory address generated in each PE, to fetch a VLIW from the VLIW memory in each PE for execution, the instructions in the VLIW fetched in each PE specified according to a function that PE is to perform.
 20. The apparatus of claim 17 wherein the input data is accessed at a stride P by a direct memory access (DMA) operation and loaded to the corresponding data memory associated with each PE.
 21. The apparatus of claim 20 wherein the DMA operation operates in parallel with the FFT computation on a clustered array to prepare a second set of input data for a subsequent FFT computation. 